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English Pages 32
Acid-base equilibria of the aquatic environment A Chem1 Reference Text Stephen K. Lower Simon Fraser University [email protected]
Natural waters contain a wide variety of solutes that act together to determine the pH, which typically ranges from 6 to 9. Some of the major processes that affect the acid-base balance of natural systems are: • Contact with atmospheric carbon dioxide • Input of acidic gases from volcanic and industrial emissions • Contact with minerals, rocks, and clays • Presence of buffer systems such as carbonate, phosphate, silicate, and borate • Presence of acidic anions, such as Fe(H2 O)3+ 6 • Input and removal of CO2 through respiration and photosynthesis • Other biological processes, such as oxidation (O2 +H+ +e− −→ H2 O), nitrification, denitrification, and sulfate reduction. In this chapter and also in the next one which deals specifically with the carbonate system, we will consider acid-base equilibria as they apply to natural waters. We will assume that you are already familiar with such fundamentals as the Arrhenius and Brønsted concepts of acids and bases and the pH scale. You should also have some familiarity with the concepts of free energy and activity. The treatment of equilibrium calculations will likely extend somewhat beyond what you encountered in your General Chemistry course, and considerable emphasis will be placed on graphical methods of estimating equilibrium concentrations of various species.
1 1.1
Proton donor-acceptor equilibria Acid-base strengths
The tendency of an acid or a base to donate or accept a proton cannot be measured for individual species separately; the best we can do is compare two donor-acceptor systems. One of these is commonly the solvent, normally water. Thus the proton exchange HA + H2 O −→ H3 O+ + A−
K
(1)
acid HClO4 HCl H2 SO4 HNO3 H3 O+ H2 SO3 HSO− 4 H3 PO4 [Fe(H2 O)6 ]3+ HF CH3 COOH [Al(H2 O)6 ]3+ H2 CO3 * H2 S H2 PO− 4 HSO− 3 HOCl HCN H3 BO4 NH+ 4 Si(OH)4 HCO− 3 SiO(OH)− 3 HS− H2 O NH3 OH−
perchloric acid hydrogen chloride sulfuric acid nitric acid hydronium ion sulfurous acid bisulfate phosphoric acid aquo ferric ion hydrofluoric acid acetic acid aquo aluminum ion total dissolved CO2 hydrogen sulfide dihydrogen phosphate bisulfite ion hypochlorous acid hydrogen cyanide boric acid ammonium ion o-silicic acid bicarbonate silicate bisulfide water ammonia hydroxide ion
pKa
base
pKb
∼ −7 ∼ −3 ∼ −3 -1 0 1.8 1.9 2.1 2.2 3.2 4.7 4.9 6.3 7.1 7.2 7.2 8.0 9.2 9.3 9.3 9.5 10.3 12.6 ∼ 14 14 ∼ 23 ∼ 24
ClO− 4 Cl− HSO− 4 NO− 3 H2 O HSO− 3 SO2− 4 H2 PO− 4 [Fe(H2 O)5 OH]2+ F− CH3 COO− [Al(H2 O)5 OH]2+ HCO− 3 HS− H2 PO2− 4 SO2− 3 OCl− CN− B(OH)− 4 NH3 SiO(OH)− 3 CO2− 3 SiO2 (OH)2− 2 S2− OH− NH− 2 O2−
∼ 21 ∼ 17 ∼ 17 15 14 12.2 12.1 11.9 11.8 10.8 9.3 9.1 7.7 6.9 6.8 6.8 6.0 4.8 4.7 4.7 4.5 3.7 1.4 ∼0 0 ∼ −9 ∼ −10
Table 1: pK values of acids and bases in aqueous solutions at 25 ◦ C
is the sum of the reactions HA −→ H+ + A− +
H2 O + H
+
−→ H3 O
K2
(2)
K3 = 1
(3)
The unity value of K3 stems from the defined value of ∆G◦ = 0 for this reaction, and assumes that the activity of the H2 O is unity. Combining these equilibrium constants, we have K2 = K1 = K2 K3 = Ka
{H+ }{A− } {HA}
(4)
and Ka = 10−pKa
pKa = − log Ka ,
(5)
Formally, equilibrium constants for reactions in ionic solutions are defined in terms of activities, in which the reference state is a hypothetical one in which individual ion activities are unity but there are
2
no ion-ion interactions in the solution of the ion in pure water. K=
{H+ }{A− } {HA}{H2 O}
(6)
There has been considerable debate about the Ka values of water and of the hydronium ion. The conventional value of 10−14 shown for H2 O in Table 1 is very commonly used, but it does not reflect the observed relative acid strength of H2 O when it is compared with other very weak acids. When such comparisons are carried out in media in which H2 O and the other acid are present in comparable concentrations, water behaves as a much weaker acid with Ka ≈ 10−16 . To understand the discrepancy, we must recall that acids are usually treated as solutes, so we must consider a proton-donor H2 O molecule in this context. Although the fraction of H2 O molecules that will lose a proton is extremely small (hence the designation of those that do so as solute molecules), virtually any H2 O molecule is capable of accepting the proton, so these would most realistically be regarded as solvent molecules. The equation that defines the acid strength of water is H2 O(solute) + H2 O(solvent) −→ H3 O+ + OH− whose equilibrium constant is
({H+ }/1)({A− }/1) /55.5) (7) ({H2 O}/1)({H2 O} in which the standard states are shown explicitly. Do you see the problem? The standard state of a solute is normally taken as unit molality, so we don’t usually show it (or even think about it!) in most equilibrium expressions for substances in solution. For a solute, however, the standard state is the pure liquid, which for water corresponds to a molality of 55.5. The value of Ka = 10−14 for water refers to the reaction H2 O −→ H+ + OH− in which H2 O is treated only as the solvent. Using Eq 7, the corresponding Ka has the value 1014 ÷55.5 = 1.8×10−16 , which is close to the observed acid strength noted above1 . What difference does all this make? In the context of Table 1 or Fig. 2, the exact pKa of water is of little significance since no other species having similar pKa s are shown. On the other hand, if one were considering the acid-base reaction between glycerol (pKa = 14.2) and water, the prediction of equilibrium concentrations (and in this case, the direction of the net reaction) would depend on which value of the water pKa is used. K=
Instead of using pure water as the reference state, an alternative convention is to use a solution of some arbitrary constant ionic strength in which the species of interest is “infinitely dilute”. In practice, this means a concentration of less than about one-tenth of the total ionic concentration. This convention, which is widely used in chemical oceanography, incorporates the equilibrium quotient into the equilibrium constant: [H+ ][A− ] c (8) K= [HA] A third alternative is to use a “mixed acidity constant” in which the hydrogen ion concentration is expressed on the activity scale (which corresponds to the values obtained by experimental pH measurements) but the acid and base amounts are expressed in concentrations. K′ =
{H+ }[A− ] HA
untelberg approximation for single-ion activities: The value of K ′ can be estimated from the G¨ √ 2 2 − zbase ) I 0.5(zacid ′ √ pK = pK + 1+ I
(9)
(10)
in which I is the ionic strength, and zacid and zbase are the ionic charges of the acid and base species. 1 For a more complete discussion and further references, see Campbell M. and Waite B., “The K values of water and a the hydronium ion for comparison with other acids”, J. Chem. Education 1990: 67(5) 386-388.
3
7.5
4.0EÐ7
3.0EÐ7 pH
[H+] = [OHÐ] 7.0 2.0EÐ7
[H+] = [OHÐ]
1.0EÐ7
pH
6.5
0 0
10
20
30
40
50
60
temperature °C
Figure 1: Dependence of [H+ ] and pH of pure water on temperature.
1.2
The ion product of water
For the autoprotolysis of water H2 O + H2 O −→ H3 O+ + OH− Kw = {H3 O+ }{OH− } ≈ [H+ ][OH− ]
(11)
The value of Kw is affected by temperature (it undergoes a 100-fold increase between 0 ◦ C and 60 ◦ C), pressure (it is about doubled at 1000 atm) and ionic strength. In pure water at 25 ◦ C Kw = 1.008×10−14 ; in seawater it is 6.3 × 10−13 . Recall that a neutral solution is one in which {H+ } = {OH− }. This means that the pH of a neutral solution is not necessarily 7.0; it varies with temperature, pressure, and ionic strength. For pure water at 1 atm, the pH is 6.998 at 25 ◦ C and it is 7.47 at 0 ◦ C. The ion product Kw is also the “Ka Kb product” for a conjugate acid-base system. Using the ammonia system as an example, the base constant Kb corresponds to − NH3 + H2 O −→ NH+ 4 + OH
and Kb =
− [NH+ 4 ][OH ] [NH3 ]
(12)
[H+ ][NH3 ] [NH+ 4]
(13)
For the conjugate acid NH+ 4 Ka = From these two relations, it is obvious that
Kw = Ka Kb
4
(14)
1.3
the pH scale
The pH as we commonly use it nowadays indicates the availability of protons in the solution; that is, the ability of the solution to supply protons to a base such as H2 O. This is the same as the hydrogen ion concentration [H+ ] only in rather dilute solutions; at ionic concentrations (whether of H+ or other ions) greater than about 0.01 M, electrostatic interactions between the ions cause the relation between the pH (as measured by direct independent means) and [H+ ] to break down. Thus we would not expect the pH of a 0.100 M solution of HCl to be exactly 1.00. Potentiometric devices such as the pH meter respond most closely to what is believed to be the hydrogen ion activity: (15) pH = − log{H+ }
There is, however, no single definition of pH. Sørensen’s original 1909 definition was in terms of [H+ ], which approximates {H+ } in very dilute solutions. The IUPAC definition is an operational one, based on a measured cell potential involving a standard buffer solution. The (U.S.) National Bureau of Standards has also established pH values for pure standard solutions such as potassium hydrogen tartrate.
2
pH and the proton free energy
An acid, being a proton donor, can only act as an acid if there is a suitable base present to accept the proton. What do we mean by “suitable” in this context? Simply that a base, in order to accept a proton, must provide a lower-free energy resting place for the proton than does the acid. Thus you can view an acid-base reaction as the “fall” of the proton from a higher free energy to a lower free energy.
2.1
Proton sources and sinks
Viewed in this way, an acid is a proton source, a base is a proton sink. The tendency for a proton to move from source to sink depends on how far the proton can fall in energy, and this in turn depends on the energy difference between the source and the sink. This is entirely analogous to measuring the tendency of water to flow down from a high elevation to a lower one; this tendency (and also the amount of energy that can be extracted in the form of electrical work if the water flows through a power station at the bottom of the dam) will be directly proportional to the difference in elevation (difference in potential energy) between the source (top of the dam) and the sink (bottom of the dam). Look carefully at Figure 2. In the center columns of the diagram, you see a list of acids and their conjugate bases. These acid-base pairs are plotted on an energy scale which is shown at the left side of the diagram. This scale measures the free energy released when one mole of protons is transferred from a given acid to H2 O. Thus if one mole of HCl is added to water, it dissociates completely and heat is released as the protons fall from the source (HCl) to the lower free energy that they possess in the H3 O+ ions that are formed when the protons combine with H2 O. Any acid shown on the left side of the vertical line running down the center of the diagram can donate protons to any base (on the right side of the line) that appears below it. The greater the vertical separation, the greater will be the fall in free energy of the proton, and the more complete will be the proton transfer at equilibrium. Notice the H3 O+ -H2 O pair shown at zero kJ on the free energy scale. This zero value of free energy corresponds to the proton transfer process H3 O+ + H2 O −→ H2 O + H3 O+ which is really no reaction at all, hence the zero fall in free energy of the proton. Since the proton is equally likely to attach itself to either of two identical H2 O molecules, the equilibrium constant is unity. 5
ACIDS
BASES
(proton donors)
(proton sinks) pH
DG
0
HClO4
ClO4Ð
H2SO4
HSO4Ð
HCl
HNO3
H3O+
Fe(H2O)63+
20
HCOOH CH3COOH Al(H2O)63+ H2CO3
40
HOCl HCN NH4+ HCO3Ð
60
HPO42Ð
NO3Ð
[HA] [AÐ] 4
2 4
HCO3Ð
8
CNÐ NH3
10
CO32Ð
12
PO43Ð
pH Ð2
Ð4
variation of concentration ratio with pH above and below pK NH3 OHÐ
6
OClÐ
OHÐ
2
0
Fe(H2O)5OH2+ HCOOÐ CH3COOÐ Al(H2O)5OH2+
H 2O
log
140
H 2O
SO42Ð
100
120
Ð4
ClÐ
Ð2
HSO4Ð
80
Ð6
NH2Ð O2Ð
strong bases (cannot exist in water)
kJ of free energy released per mole of protons transferred from H3O+
Ð20
strong acids (cannot exist in water)
Ð40
Ð8
14 16 18 20 22 24
Figure 2: Free energy diagram for acids and bases in aqueous solution.
6
Now look at the acid/base pairs shown at the top of the table, above the H3 O+ -H2 O line. All of these acids can act as proton sources to sinks (bases) that appear below them. Since H2 O is a suitable sink for these acids, all such acids will lose protons to H2 O in aqueous solutions. These are therefore all strong acids that are 100% dissociated in aqueous solution; this total dissociation reflects the very large equilibrium constants that are associated with any reaction that undergoes a fall in free energy of more than a few kilojoules per mole.
2.2
Leveling effect
Because H2 O serves as a proton sink to any acid in which the proton free energy level is greater than zero, the strong acids such as HCl and H2 SO4 cannot “exist” (as acids) in aqueous solution; they exist as their conjugate bases instead, and the only proton donor present will be H3 O+ . This is the basis of the leveling effect, which states that the strongest acid that can exist in aqueous solution is H3 O+ . Now consider a weak acid, such as HCN at about 40 kJ/mol on the scale. This positive free energy means that in order for a mole of HCN to dissociate (transfer its proton to H2 O), the proton must gain 40 kJ of free energy per mole. In the absence of a source of energy, the reaction will simply not go; HCN is dissociated only to a minute extent in water.
2.3
Dissociation of weak acids
Why is HCN dissociated at all? The molecules in solution are continually being struck and bounced around by the thermal motions of neighboring molecules. Every once in a while, a series of fortuitous collisions will provide enough kinetic energy to a HCN molecule to knock off the proton, effectively boosting it to the level required to attach itself to water. This process is called thermal excitation , and its probability falls off very rapidly as the distance (in kJ/mol) that the proton must rise increases. The protons on a “stronger” weak acid such as HSO− 4 or CH3 COOH will be thermally excited to the H3 O+ level much more frequently than will the protons on HCN or HCO− 3 , hence the difference in the dissociation constants of these acids.
2.4
Titration
Although a weak acid such as HCN will not react with water to a significant extent, you are well aware that such an acid can still be titrated with strong base to yield a solution of NaCN at the equivalence point. To understand this process, find the H2 O-OH− pair at about 80 kJ/mol on the free energy scale. Because the OH− ion can act as a proton sink to just about every acid shown on the diagram, the addition of strong base in the form of NaOH solution allows the protons at any acid above this level to fall to the OH− level according to the reaction H+ + OH− −→ H2 O Titration, in other words, consists simply in introducing a low free energy sink that can drain off the protons from the acids initially present, converting them all into their conjugate base forms.
2.5
Strong bases
There are two other aspects of the H2 O-H3 O+ pair that have great chemical significance. First, its location at 80 kJ/mol tells us that for a H2 O molecule to transfer its proton to another H2 O molecule (which then becomes a H3 O+ ion whose relative free energy is zero), a whopping 80 kJ/mol of free energy must be supplied by thermal excitation. This is so improbable that only one out of about 10 million H2 O
7
molecules will have its proton kicked upstairs at a given time; this corresponds to the small value of the ion product of water, about 10−14 . The other aspect of the H2 O-OH− pair is that its location defines the hydroxide ion as the strongest base that can exist in water. On our diagram only two stronger bases (lower proton free energy sinks) 2− . What happens if you add a soluble oxide such are shown: the amide ion NH− 2 , and the oxide ion O 2− as Na2 O to water? Since O is a proton sink to H2 O, it will react with the solvent, leaving OH− as the strongest base present: Na2 O + H2 O −→ 2OH− + Na+ This again is the leveling effect; all bases stronger than OH− appear equally strong in water, simply because they are all converted to OH− .
2.6
Proton free energy and pH
On the right side of Figure 2 is a pH scale. At the pH value corresponding to a given acid-base pair, the acid and base forms will be present at equal concentrations. For example, if you dissolve some solid 2 sodium sulfate in pure water and then adjust the pH to 2.0, about half of the SO− 4 will be converted into . Similarly, a solution of Na CO in water will not contain a very large fraction of CO2− unless HSO− 2 3 4 3 the pH is kept above 10. The pH is a measure of the free energy per mole of protons. This can be seen by writing pH = pKa + log
∆G◦ [A− ] [A− ] = + log [HA] 2.3 RT [HA]
(16)
and since ∆G = ∆G◦ + RT ln Q ∆G ∆G◦ [A− ] = + log (17) 2.3 RT 2.3 RT [HA] It is for this reason that we can show both pH and free energy scales in Fig. 2. You already know that the free energy of a substance increases with its concentration, so it makes sense that at lower pH values (greater H+ concentration) the proton free energy in the solution will be higher. This provides another view of the effect of pH on the relative concentrations of the conjugate pairs of various acid-base systems in a solution; the pH effectively sets the average free energy of protons available in the solution. As the value of this latter quantity increases, higher proton-vacant levels will be converted into their protonated forms, and there will be more thermal excitation of these protons to H2 O, resulting in more H3 O+ ions. Suppose we have a mixture of many different weak acid-base systems, such as exists in most biological fluids or natural waters, including the ocean. The available protons will fall to the lowest free energy levels possible, first filling the lowest-energy sink, then the next, and so on until there are no more proton-vacant bases below the highest proton-filled (acid) level. Some of the highest protonated species will donate protons to H2 O through thermal excitation, giving rise to a concentration of H3 O+ that will depend on the concentrations of the various species. The equilibrium pH of the solution is a measure of this H3 O+ concentration, but this in turn reflects the relative free energy of protons required to keep the highest protonated species in its acid form; it is in this sense that pH is a direct measure of proton free energy. In order to predict the actual pH of any given solution, we must of course know something about the nominal concentrations (Ca ) of the various acid-base species, since this will strongly affect the distribution of protons. Thus if one proton-vacant level is present at twice the concentration of another, it will cause twice as many acid species from a higher level to become deprotonated. In spite of this limitation, the proton free energy diagram provides a clear picture of the relationships between the various acid and base species in a complex solution. 8
3
Quantitative treatment of acid-base equilibria
3.1
Strong acids and bases
An acid or base is said to be “strong” if it is completely ionized in aqueous solution. Hydrochloric acid is a common example of a strong acid. When HCl gas is dissolved in water, the resulting solution contains the ions H3 O+ , OH− , and Cl− . In order to specify the concentrations of these three species, we need three independent relations between them. (Mathematically, this means that we must write three equations which are then solved simultaneously). These relations are obtained by observing that certain conditions must always be true in any solution of HCl. These are: 1. The dissociation equilibrium of water must always be satisfied: [H3 O+ ][OH− ] = Kw
(18)
2. For any acid-base system, one can write a material balance equation that relates the concentrations of the various dissociation products of the substance to its “nominal concentration”, which we designate here as Ca . For a solution of HCl, this equation would be [HCl] + [Cl− ] = Ca but since HCl is a strong acid, we can neglect the first term and write the trivial mass balance equation [Cl− ] = Ca (19) 3. In any ionic solution, the sum of the positive and negative electric charges must be zero; in other words, all solutions are electrically neutral. This is known as the electroneutrality principle. [H3 O+ ] = [OH− ] + [Cl− ]
(20)
The next step is to combine these three equations into a single expression that relates the hydronium ion concentration to Ca . This is best done by starting with an equation that relates several quantities, such as Eq 20, and substituting the terms that we want to eliminate. Thus we can get rid of the [Cl− ] term by substituting Eq 19 into Eq 20: [H3 O+ ] = [OH− ] + Ca
(21)
A [OH− ]-term can always be eliminated by use of Eq 18: [H3 O+ ] = Ca +
Kw [H3 O+ ]
(22)
This equation tells us that the hydronium ion concentration will be the same as the nominal concentration of a strong acid as long as the solution is not very dilute. As the acid √ concentration falls below about 10−6 M, however, the second term predominates; [H3 O+ ]approaches Kw , or 10−7 M. The hydronium ion concentration can of course never fall below this value; no amount of dilution can make the solution alkaline! Notice that Eq 22 is a quadratic equation; in regular polynomial form it would be 2
[H3 O+ ] − Ca [H3 O+ ] − Kw = 0 9
(23)
3.2
The strong ion difference
Suppose that we mix a solution of NaOH with a solution of HCl; this would happen during a titration, for example. In this case, we have a fourth variable, the Na+ concentration. This alters the charge balance equation: (24) [Na+ ] − [Cl− ] + [H3 O+ ] − [OH− ] = 0 Combining this with Eq 18 we obtain 2
[H3 O+ ] + ([Na+ ] − [Cl− ])[H3 O+ ]Kw = 0
(25)
This can be solved for [H3 O+ ]by means of the quadratic formula, yielding [H3 O+ ] =
µ
Kw +
[Na+ ] − [Cl− ] 4
¶ 12
−
[Na+ ] − [Cl− ] 2
(26)
Notice that the hydronium ion concentration depends on the difference between the concentrations of the cation and the anion. This difference term is known as the strong ion difference, abbreviated SID: [SID] = [Na+ ] − [Cl− ]
(27)
Thus Eq 26 becomes [H+ ] =
p
Kw + [SID]/2 − [SID]/2
(28)
What is a “strong” ion? It is one whose concentration is always the same as the nominal concentration of the acid, base or salt that it comes from. Thus the anions of strong acids and the cations of most metals are strong ions. The ions H3 O+ and OH− are not strong ions; their concentrations are only the same as those of their parent acid or base if the acid or base is totally dissociated in solution, and the solution is not too dilute. Other examples of “weak” ions are acetate, bicarbonate, etc. In general, then, X X [SID] = [strong cations] − [strong anions] (29) The SID is a very useful concept, because it allows us to write a simple equation that is completely general. For example, Eq 29 can be applied to a complex mixture made from HCl, MgSO4 , NH4 OH and NaOH: (30) [SID] = [Na+ ] + [K+ ] + [Mg2+ ] − [Cl− ] − [SO2+ 4 ] There are three particulary important points about the SID that you should understand: 1. Since it is a concentration difference, [SID] can be positive or negative; its sign tells us whether the solution is acidic or alkaline: [SID] < 0 [SID] = 0 [SID] > 0
[H3 O+ ] > [OH− ] √ [H3 O+ ] = [OH− ] = Kw [H3 O+ ] < [OH− ]
(acidic solution) (neutral solution) (alkaline solution)
2. When an acid is titrated with a base, we are in effect simply increasing the [SID] (from its initial negative value) by adding a strong cation. 3. Although [SID] can be positive or negative, the sum of the moles of charge from all the ions (strong and weak ones together) must always be zero. This means that when [SID]6= 0, the difference must be compensated for by “weak” ions. 10
The SID is also known as the alkalinity or the acid-neutralizing capacity; the higher the [SID] (i.e., the greater the concentration of base such as NaOH or Na2 CO3 ), the more moles/litre of strong acid required to reduce the pH to a given reference level. This reference level is not necessarily, or even usually, 7.0; for natural waters, a level of about 4.5 is employed, since this corresponds to the pH of pure water in equilibrium with atmospheric CO2 . Since virtually all natural waters contain dissolved strong cations such as Na+ , Ca2+ etc., all such waters possess some degree of alkalinity, even if they are acidic on the pH scale.
3.3
Weak monoprotic acids
Most acids are weak; there are hundreds of thousands of them, whereas there are no more than a few dozen strong acids. We can treat weak acid solutions in exactly the same general way as we did for strong acids. The only difference is that we must now include the equilibrium expression for the acid. We will start with the simple case of the pure acid in water, and then go from there to the more general one in which strong cations are present. In this exposition, we will refer to “hydrogen ions” and [H+ ] for brevity, and will assume that the acid HA dissociates into H+ and its conjugate base A− .
3.4
Pure acid in water
In addition to the species H+ , OH− , and A− which we had in the strong-acid case, we now have the undissociated acid HA; four variables, four equation. 1. equilibria. We now have two equilibrium relations: [H+ ][OH− ] = Kw
(31)
[H+ ][A− ] = Ka [HA]
(32)
2. mass balance. The mass balance relation expresses the nominal concentration of the acid in terms of its two conjugate forms: Ca = [HA] + [A− ] (33) 3. electroneutrality. [H+ ] = [A− ] + OH−
(34)
We can use Eq 33 to get an expression for [HA], and this can be solved for [A− ]; these are substituted into Eq 32 to yield Ka =
[H+ ]([H+ ] − [OH− ]) Ca − ([H+ ] − [OH− ])
(35)
Getting rid of [OH− ], solving for [H+ ], we obtain a cubic equation: 3
2
[H+ ] + Ka [H+ ] − (Kw + Ca Ka )[H+ ]) − Kw Ka = 0
(36)
For most practical applications, we can make approximations that eliminate the need to solve a cubic equation.
11
1. Unless the acid is extremely weak or the solution is very dilute, the concentration of OH− can be neglected in comparison to that of [H+ ]. If we assume that [OH− ] ≪ [H+ ], then Eq 35 can be simplified to 2
Ka =
[H+ ] Ca − [H+ ]
(37)
which is a quadratic equation: 2
[H+ ] + Ka [H+ ] − Ka Ca = 0
(38)
2. If the acid is fairly concentrated (usually more than 10−3 M), a further simplification can frequently be achieved by making the assumption that [H+ ] ≪ Ca . This is justified when most of the acid remains in its un-ionized form [HA], so that relatively little H+ is produced. In this event, Eq 37 reduces to 2
Ka =
[H+ ] Ca
or
(39) 1
[H+ ] ≈ (Ka Ca ) 2
3.5
(40)
Calculations on mixtures of acids
Many practical problems relating to environmental and physiological chemistry involve solutions containing more than one acid. Several methods have been published for calculating the hydrogen ion concentration in solutions containing an arbitrary number of acids and bases2 . These generally involve iterative calculations carried out by a computer. In this section, we will restrict ourselves to a much simpler case of two acids, with a view toward showing the general method of approaching such problems by starting with charge- and mass-balance equations and making simplifying assumptions when justified. In general, the hydrogen ions produced by the stronger acid will tend to suppress dissociation of the weaker one, and both will tend to suppress the dissociation of water, thus reducing the sources of H+ that must be dealt with. Consider a mixture of two weak acids HX and HY; their respective nominal concentrations and equilibrium constants are denoted by Cx , Cy , Kx and Ky . Starting with the charge balance expression [H+ ] = [X− ] + [Y− ] + [OH− ] We use the equilibrium constants to replace the conjugate base concentrations with expressions of the form [HX] [X− ] = Kx + [H ] to yield [H+ ] =
[HX] [HY] + + Kw Kx Ky
Multiplying both sides by [H+ ] allows us to eliminate [OH− ]: 2
[H+ ] = Kx [HX] + Ky [HY] 2 See,
for example, J. Chem. Education 67(6) 501-503 (1990) and 67(12) 1036-1037 (1990).
12
If neither acid is very strong nor very dilute, we can replace equilibrium concentrations with nominal concentrations: p [H+ ] ≈ Cx Kx + Cy Ky + Kw
For a solution containing 0.10 Macetic acid (Ka = 1.75E-5) and 0.20 Mphenol (Ka = 1.00E-10) this yields a reasonable answer. But if 0.001 Mchloracetic acid (Ka = .0014) is used in place of phenol, the above expression becomes p [H+ ] = 1.40E-6 + 1.75E-8 + 10−14 = 0.00118 M
which exceeds the concentration of the stronger acid; because the acetic acid makes a negligible contribution to [H+ ] here, the simple approximation given above is clearly invalid. We now use the mass balance expression for the stronger acid [HX] + [X− ] = Cx to solve for [X− ] which is combined with the expression for Kx to yield [X− ] = Cx −
[H+ ][X− ] Kx
Solving this for [X− ] gives [X− ] =
Cx Kx Kx + [H+ ]
The approximation for the weaker acetic acid (HY) is still valid, so we retain it in the subtituted electronegativity expression: Cx Kx Cy Ky [H+ ] = + + Kx + [H ] [H+ ] which is a cubic equation that can be solved by approximation.
3.6
Mixture of an acid and its conjugate base
If we add some sodium hydroxide to a solution of an acid, then an equivalent amount of the acid will be converted into its base form, resulting in a “partly neutralized” solution in which both the acid and its conjugate base are present in significant amounts. Solutions of this kind are far more common than those of a pure acid or a pure base, and it is very important that you have a thorough understanding of them. For example, suppose that we have a solution containing 0.010 mole of acetic acid. To this we add 0.002 mole of sodium hydroxide, which consumes this same amount of acid and produces 0.002 mole of acetate ion. If the volume of the final solution is 100 ml, then the nominal acid and base concentrations are .010 − .002 mol .002 Ca = = .080 M and Cb = = .020 M .100 L .100 Note that this solution would be indistinguishable from one prepared by combining Ca = .080 mole of acetic acid with Cb = 0.020 mole of sodium acetate and adjusting the volume to 100 ml.
The equilibrium expressions for such a solution are just the ones for the pure-acid case: Eq 31 and Eq 32 . The mass balance for the acid now contains the additional term Cb ; note that in the preceding example, this sum will have the value 0.100 M: [HA] + [A− ] = Ca + Cb 13
(41)
There is a new mass balance equation for the cation, but it is trivial: [Na+ ] = Cb
(42)
The charge balance equation must also include [Na+ ]: [Na+ ] + [H+ ] = [OH− ] + [A− ]
(43)
Substituting Eq 42 into the above expression yields an equation for [A− ]: [A− ] = Cb + [H+ ] − [OH− ]
(44)
Inserting this into Eq 41 and solving for [HA], [HA] = Ca − ([H+ ] − [OH− ])
(45)
Finally we substitute these last two expressions into the equilibrium constant Eq 32 : [H+ ] = Ka
Ca − [H+ ] + [OH− ] Cb + [H+ ] − [OH− ]
(46)
which is cubic in [H+ ] when Kw /[OH− ] is replaced by [H+ ]: 3
2
[H+ ] + (Cb + 1)[H+ ] − (Kw + Ca Ka )[H+ ] − Kw = 0
(47)
In almost all practical cases it is possible to make simplifying assumptions. Thus if the solution is known to be acidic or alkaline, then the [OH− ] or [H+ ] terms in Eq 46 can be neglected. In acidic solutions, for example, Eq 46 becomes [H+ ] ≈ Ka
Ca −[H+ ] Cb +[H+ ]
(48)
If the concentrations Ca and Cb are sufficiently large, it may be possible to neglect the [H+ ] terms entirely, leading to the commonly-seen expression a [H+ ] ≈ Ka C C b
(49)
This latter relation is an extremely important one which you must know; it is sometimes referred to as the Henderson-Hasselbalch equation. Pitfalls of the Henderson-Hasselbalch equation The above equation will be found in virtually all textbooks and is widely used in practical calculations. What most books do not tell you is that Eq 49 is no more than an “approximation of an approximation” which can give incorrect and misleading results when applied to situations in which the simplifying assumptions are not valid. Unless you know what you are doing, your starting point should normally be Eq 48 for solutions that are expected to be acidic, or an analogous relation which can easily be derived for alkaline solutions. Problem Example 1 Calculate the pH of a solution prepared by adding 0.10 mole of NaOH to a solution containing 0.20 mole/litre of iodic acid, HIO3 , Ka = 0.2.
14
0
2
4
6
7
8
10
12
Ð Ð2
log C Ð4 stro ng aci d
e bas ng stro
Ð6
2
4
6
8
10
12
pH
How dilute can a solution with [A− ] = Cb be and still exhibit useful buffering action? As you can see from these plots, the answer depends very much on the pKa of the particular acid-base system. (The pKa values are indicated near the top of the figure.) The lines marked ±∞ correspond to the limiting cases of a strong acid and a non-acid. The vertical part of each plot corresponds to the concentration range in which the approximation Eq 49 is valid.
Figure 3: Buffering action as a function of buffer concentration
15
Solution: Eq 49 predicts a hydrogen ion concentration of [H+ ] = Ka
0.10 Ca = 0.2 = 0.2 Cb 0.10
or a pH of 0.70, but this is wrong. The problem is that HIO3 is a rather “strong” weak acid, so the value of [H+ ] will be comparable in magnitude to those of Ca and Cb in Eq 48. Placing this equation in standard polynomial form yields 2
[H+ ] + (Ca + Ka )[H+ ] − Ka Ca = 0
(50)
Solving this for [H+ ] using the values in the problem gives a hydrogen ion concentration of 0.056 M and a pH of 1.2; notice that these results are quite different from what Eq 49 would predict.
Be careful about confusing the two relations [H+ ] = Ka
[HA] [A− ]
and
[H+ ] ≈ Ka
Ca Cb
The one on the left is simply a re-writing of the equilibrium constant expression, and is therefore always true. Of course, without knowing the actual equilibrium values of [HA] and [A− ], this relation is of little direct use in pH calculations. The equation on the right is never true, but will yield good results if the acid is sufficiently weak in relation to its concentration to keep the [H+ ] from being too high. Otherwise, the high [H+ ] will convert a significant fraction of the A− into the acid form HA, so that the ratio [HA]/[A− ] will differ from Ca /Cb in the above two equations. Consumption of H+ by the base will also raise the pH above the value predicted by Eq 49 as we saw in the preceding problem example. Finally, notice that Eq 49 can give absurd values of hydrogen ion concentration if one of Ca or Cb is extremely small.
3.7
General case of a weak acid/base system, using [SID]
By using the strong ion difference defined in Eq 29 , we can obtain a single set of relations which will be valid for both of the cases which we have just treated. This is especially useful for following the titration of a weak acid with a strong base; as was pointed out previously, such a titration corresponds to raising the [SID] from the negative value it has in the pure acid to zero, its value at the equivalence point. If the acid is being titrated with sodium hydroxide, then [SID] = [Na+ ]. The four equations required to specify the values of [A− ], [OH− ], [HA] and [A− ] are the same as in the pure-acid case, except that the [SID] term is added to the charge balance: water dissociation : acid dissociation : mass balance : charge balance :
[H+ ][OH− ] = Kw [H+ ][A− ] = Ka [HA] [HA] + [A− ] = Ca [SID] + [H+ ] − [A− ] − [OH− ] = 0
Eliminating [OH− ] and [A− ] by appropriate substitution, the last equation can be written as [SID] + [H+ ] −
Ca Kw =0 + − Ka [H ] Ka + [H+ ]
16
(51)
Clearing fractions and rewriting in polynomial form, this becomes 3
2
[H+ ] + [H+ ] (Ka + [SID]) + [H+ ]{Ka ([SID] − Ca ) − Kw } − Ka Kw = 0
(52)
In a moderately concentrated solution of a weak acid which has been partially neutralized, [SID] is positive and large compared to [H+ ] and [OH− ]. If the latter two terms are dropped from the charge balance expression, the electroneutrality condition becomes [A− ] ≈ [SID]. Using this approximation, together with [HA] ≈ Ca we can develop the expression corresponding to Eq 49: [H+ ] =
3.8
Ka [HA] Ca Ka ≈ [SID] [A− ]
(53)
Example calculations involving conjugate species Problem Example 2 Calculate the pH of a solution containing 0.0100 mole of ammonium chloride and 0.0200 mole of ammonia in 100 ml of solution. Solution: The equilibrium here is + NH3 + H2 O −⇀ ↽− NH4 + OH− −9.3 and thus Kb = 10−(14−(−9.3)) = 10−4.7 : For NH+ 4 , Ka = 10 − [NH+ 4 ][OH ] = 10−4.7 [NH3 ]
The nominal concentrations of the acid and conjugate base are respectively Ca = 0.100 M and Cb = 0.200 M . The mass balance expressions are [NH+ 4 ] + [NH3 ] = Ca + Cb = 0.30
and
[Cl− ] = Ca
and the charge balance is given by + [Cl− ] + [OH− ] = [H+ ] + [NH+ 4 ] ≈ [NH4 ]
in which the approximation shown above is justified by our knowledge that the solution will be weakly alkaline. The equilibrium concentrations of the conjugate species are then − [NH+ 4 ] = 0.100 + [OH ]
and
[NH3 ] = 0.200 − [OH− ]
Because Ca and Cb are large compared to [OH− ] (the solution is not expected to be strongly alkaline), the [OH− ] terms in the above expressions can be dropped and the equilibrium expression becomes (0.100)[OH− ] = 2.0E–5 0.200 from which we find [OH− ] = 4.0E–5, pOH = 4.4 and pH = 9.6.
Problem Example 3 What will be the change in the pH if 10 ml of 0.100 M HCl is added to 100 ml of the above solution? Solution: We can continue using the approximations for the concentrations of the conjugate species that we developed in the preceding example. Addition of the strong acid (1.0 mmol) converts this amount of NH3 into NH+ 4 and also increases the total volume of the solution. The values of Cb and Ca are now (20 mmol − 1 mmol) Cb = [NH3 ] = = 0.173 M 110 ml
17
and
(10 mmol + 1 mmol) = 0.100 M 110 ml Substituting these into the equilibrium constant expression yields Ca = [NH+ 4 ] =
[OH− ] =
[NH3 ] Kb = 1.73 × 2.0 × 10−5 = 3.46E–5 [NH+ ] 4
The new pOH is 4.5, so addition of the acid has changed the pH to 9.5, a decrease of only 0.1 pH unit.
Problem Example 4 Calculate the pH of a 0.01 M solution of ammonium chloride in pure water. Solution: From the charge balance expression − + − [NH+ 4 ] + [H ] = [OH ] + [Cl ]
we can drop the [OH− ] term since we know that the solution will be weakly acidic. Using this approximation and the mass balance on the conjugate species, we have + [NH+ 4 ] = 0.01 − [H ]
[NH3 ] = [H+ ]
and
Substituting these into the Ka expression for [NH+ 4 ], we obtain [H+ ] =
[NH+ 0.01 − [H+ ] 4 ] × 5.0 × 10−10 Ka = [NH3 ] [H+ ]
Can we drop the [H+ ] term in the numerator? Doing so yields [H+ ] =
p
0.01 × 5 × 10−10 = 2.2E–6
Because this value is small compared to 0.01, this approximation is acceptable and the pH is 5.6.
A salt of a weak acid gives an alkaline solution, while that of a weak base yields an acidic solution. What happens if we dissolve a salt of a weak acid and a weak base in water? Problem Example 5 Estimate the pH of a 0.0100 M solution of ammonium formate in water. Formic acid, HCOOH, is the −9.3 simplest organic acid and has Ka = 10−3.7 = 1.76E–4. For NH+ . 4 , Ka = 10 Solution: Three equilibria are possible here; the reaction of the ammonium and formate ions with water, and their reaction with each other: NH+ 4 + H2 O HCOO− + H2 O − NH+ 4 + HCOO
−⇀ ↽− −⇀ ↽− −⇀ ↽−
NH3 + H3 O+ HCOOH + OH− NH3 + HCOOH
K2 =
K1 = 10−9.3 = 10−10.3 K3
10−14 10−3.7
Inspection reveals that the last equation is the sum of the first two, plus the reaction H+ + OH− −→ 2 H2 O
K4 = 1/Kw
The value of K3 is therefore K3 =
10−9.3 × 10−10.3 = 10−5.6 Kw
A rigorous treatment of this system would require that we solve these equations simultaneously with the charge balance and the two mass balance equations. However, because K3 is several orders
18
of magnitude greater than K1 or K2 , we can greatly simplify things by neglecting the other equilibria and considering only the reaction between the ammonium and formate ions. Notice that the products of this reaction will tend to suppress the extent of the first two equilibria, reducing their importance even more than the relative values of the equilibrium constants would indicate. From the stoichiometry of ammonium formate we can write can write − [NH+ 4 ] = [HCOO ]
Then K3 =
and
[NH3 ] = [HCOOH]
[NH3 ][HCOOH] [HCOOH]2 Kw = = + − Ka K b [HCOO− ]2 [NH4 ][HCOO ]
in which Kb is the base constant of ammonia, Kw /10−9.3 . From the formic acid dissociation equilibrium we have [HCOOH] [H+ ] − = Ka [HCOO ] Rewriting the expression for K3 , 2
K3 =
[HCOOH]2 [H+ ] Kw = − 2 = Ka Kb Ka 2 [HCOO ]
Which yields +
[H ] =
r
Kw Ka = 10−6.5 Kb
What is interesting about this last example is that the pH of the solution is apparently independent of the concentration of the salt. If Ka = Kb then this is always true and the solution will be neutral (neglecting activity effects in solutions of high ionic strength). Otherwise, it is only an approximation that remains valid as long as the salt concentration is substantially larger than the magnitude of either equilibrium constant. Clearly, the pH of any solution must approach that of pure water as the solution becomes more dilute.
3.9
Diprotic acids
A diprotic acid such as H2 SO4 can donate its protons in two steps, yielding first a monoprotonated 2− species HSO− 4 and then the completely deprotonated form SO4 . Since there are five unknowns (the concentrations of the acid, of the two conjugate bases and of H3 O+ and OH− ), we need five equations to define the relations between these quantities. These are • Equilibria:
• Charge balance:
[H+ ][OH− ] = Kw
(54)
[H+ ][HA− ] = Ka1 [H2 A]
(55)
[H+ ][A2− ] = Ka2 [HA− ]
(56)
[H3 O+ ] = [HA] + 2[A2− ]
(57)
19
• Material balance: When we start with Ca moles per litre of the acid H2 A, the concentrations of those species containing the species A must add up to the amount initially present. Ca = [H2 A] + [HA− ] + [A2− ]
(58)
The full equation is µ
¶ 2K2 ([H+ ]−[OH− ]) [H ] [H ] − [OH ] − [H+ ]+2K2 µ ¶ K2 = 2K2 ([H+ ]−[OH− ]) + − Ca − [H ] − [OH ] − [H+ ]+2K2 +
+
−
(59)
which can be expressed as the quartic polynomial 4
3
2
[H+ ] + [H+ ] ([A− ] + K1 ) = [H+ ] (K1 K2 − Kw ) − [H+ ][K1 ([A− ]K2 + Kw )] − K1 K2 Kw = 0
(60)
There are very few, if any practical situations in which this exact relation needs to be used. If the solution is at all acidic then [OH− ] is negligible compared to [H+ ] and the first equation reduces to µ ¶ 2K [H+ ] [H+ ] [H+ ] − +2 [H ]+2K2 µ ¶ K1 = (61) K [H+ ] Ca − [H+ ] − +2 [H ]+2K2 For many polyprotic acids the second acid constant K2 is small. If the solution is sufficiently acidic so that K2 ≪ [H+ ], then the preceding expression can be greatly simplified: 2
K1 =
[H+ ] Ca − [H+ ]
(62)
This is the usual starting point for most practical calculations. Finally, if the solution is sufficiently concentrated (and Ka is sufficiently small) so that [H+ ] ≪ Ca , we can obtain 1
[H+ ] = (Ka Ca ) 2
(63)
Notice that the K2 term does not appear in these last two equations; this suggests that the pH of a weak polyprotic acid is largely determined by the first ionization step. One rationale for this is that the H3 O+ produced by the first ionization step will, according to Le Chˆ atelier’s principle, tend to repress the ionization of the second step.
4 4.1
Mixtures of conjugate acids and bases Buffer solutions
A solution in which both the acid and base forms of a conjugate pair are present in significant concentrations corresponds to a partially-neutralized acid or base in which [SID] is positive and large compared to [H+ ], [A− ] and [OH− ]. These are the same conditions that to the approximation Eq 53 which, when rewritten in logarithmic form, is known as the Henderson-Hasselbalch equation pH = pKa + log
Cb [SID] − = pKa + log [A ] [A− ] 20
(64)
The tendency of added strong acid or base to change the pH of a solution is seen to depend on the relative magnitudes of the two terms on the right. This tendency is given by the slope of the titration curve: β=
d[A− ] dCb =− dpH dpH
(65)
The quantity β is known as the buffer intensity or buffer index. An exact expression for β can be obtained
species distribution
buffer intensity
titration curve
OHÑ A2Ð 12 HAÐ
AAAAAAAAAAAAAAAA AAAAAAAAAAAAAA
pK2
pK1
8 6 4
HAÐ
H+
2
H 2A 0 0
2
4
6
8
Ðlog C
0
2 4 6 b ´ 104 mol LÐ1 / (pH unit)
0
.5
1.0
1.5
2.0
f
Figure 4: Buffer intensity and titration curve for a diprotic acid by differentiating the equation for [H+ ]: 2
β=
[H+ ] + Ka [H+ ] 2
3[H+ ] + 2[H+ ](Ka + [SID]) + Ka ([SID] − [A− ]) − Kw
(66)
A buffer solution is one whose pH tends to be insensitive to the amount of strong acid or strong base added, and which therefore has a large buffer intensity. In pure water, β is very small: 4.6 × 10−7 mol/l. Under optimum buffering conditions when [SID] ≈ Ca /2, β = 2.5 +
Kw Ca − 4Ka 2Ka 2
or, approximately, β≈
Ca 4Ka
21
(67)
(68)
[Stumm & Morgan: Aquatic Chemistry ]
10
A common misconception is that only weak-acid/base systems can act as buffer solutions. The set of plots shown in Fig. 5 demonstrate that this is not correct; even a solution having [SID] = 0 can act as a buffer, but only at very high or low pH values. Within this effective range, a solution containing no weak acid at all is even a better buffer, since changes in [H+ ] are almost completely compensated for by water autoprotolysis. In a weak-acid solution, A− ions (as well as OH− ions) are available to maintain charge balance, so the fraction of negative ions that are capable of neutralizing any added H+ is smaller. The real effect of a conventional buffer system is to set the pH range of buffering from its strong-acid value of [H+ ] ≈ Kw /[SID] to a value closer to neutrality. Within this range, buffering is most effective at higher [A− ] and when [HA] = [A− ].
4.2
Titrations
The titration of an aqueous solution of an acid HA consists in measuring the volume of strong base MOH required to reach the equivalence point at which [M+ ] = [A− ]. If HA is a strong acid, the equivalence point corresponds to [SID] = 0; for a weak acid, [SID] = [M+ ]. If the solution being titrated contains C equivalents/l of acid, the equivalent fraction of base added is given by [SID] [M+ ] = (69) f= C C The titration curve is a plot of pH as a function of the titration fraction f . At the beginning of the titration, f = 0 for a solution of a strong acid. At f = 0.5, pH = pKa ; at the equivalence point, f = 1 and the pH is that of a solution of the pure salt MA. For polyprotic acids, f = 2 at the second equivalence point, etc. If Vb litres of base is required to titrate Va litres of a monoprotic acid to the equivalance point, the titration curve is defined by the exact equation µ ¶ ¶ µ Ka Cb Vb − Ka [A− ]Va Vb Cb 3 2 [H+ ] + [H+ ] + Ka + [H+ ] (70) − K w Ka = 0 V a + Vb V a + Vb The weaker the acid, the less well-defined is the rise in pH near the equivalence point (Fig. 6). This can be regarded as an effect of buffering, which is always most effective near the pKa of the acid.
4.3
Ionization fractions
It is important to be able to express the relative amounts of a conjugate acid-base system present in the protonated and deprotonated forms. The simple ratio [HA]/[A− ] (or its inverse) is often used, but this suffers from the disadvantage of being indeterminate when the concentration in the denominator is zero. For many purposes it is more convenient to use the ionization fractions α0 ≡ αHA =
[HA] ; [HA] + [A− ]
α1 ≡ αA− =
[A− ] [HA] + [A− ]
(71)
The fraction α1 is also known as the degree of dissociation of the acid. By making appropriate substitutions using the relation [HA] [H+ ] = Ka − (72) [A ] . we can express the ionization fractions as a function of the pH: α0 ≡ αHA =
[H+ ] ; Ka + [H+ ]
α1 ≡ αA− = 22
Ka Ka + [H+ ]
(73)
0
2
4
6
7
8
10
12
Ð Ð2
log C Ð4 stro ng aci d
e bas ng stro
Ð6
2
4
6
8
10
12
pH
Figure 5: Buffering in strong- and weak-acid solutions
12
¥
10
pK
8
8
pH
6
6
4
4 2 0
strong acid 0
.5 fraction titrated
1
Figure 6: Titration curves of acids and bases of various strengths
23
Figure 7: Titration curve for a polyprotic acid, H3 PO4
1.0
a0
a1
.8
.6
.4
.2
pH
pK Ð 1
pK
pK + 1
Figure 8: Equilibrium fraction diagram for a monoprotic acid.
24
In the plot of these two functions shown in Fig. 8, notice the crossing point where [HA] = [A− ] when [H+ ] = Ka . This corresponds to unit value of the quotient in Eq 72. P For a polyprotic system, i αi = 1. For a diprotic acid, also, α0 =
[A2− ] = Ca α2
[HA− ] = Ca α1 ,
[H2 A] = [A− ]α0 ,
[H+ ] α1 , K1
α1 =
[H+ ] α2 K2
(74)
(75)
During the course of a titration, the electroneutrality condition requires that Cb = Ca α1 + [OH− ] − [H+ ] = Ca α1 + [OH− ] + [H+ ]
(76)
and thus
[OH− ] − [H+ ] (77) Ca In exact calculations it is necessary to correct for dilution of the acid by the water introduced with the base: V◦ (78) C = C◦ V◦ + V in which the subscripted terms refer to the initial acid solution. f = α1 +
5
Logarithmic concentration diagrams
By treating the pH as a master variable that uniquely determines the concentrations of all species involved in a given equilibrium system, it is possible to develop graphical presentations that are easy to construct and highly informative. Look at Fig. 9 and note the two diagonal lines labeled [H+ ] and [oh-]. These are simply the definitions of pH and pOH and their placements should be apparent. The other two lines, representing the concentrations of the acid and base forms as functions of the pH, are constructed by making approximations appropriate to the various pH ranges. • Where pH = pKa , [HA] = [A− ] = Ca /2; this defines the point labeled 2 whose y-coordinate is at log Ca − log 2, which falls 0.3 unit below log Ca . • When pH ≪ pKa , the mixture consists essentially of a solution of HAc in water. The proton balance for such a solution is [H3 O+ ] = [A− ] + [OH− ] ≈ [A− ]
(79)
Within this pH region, the slope of the [A]-vs-pH curve is easily shown to be unity: [H+ ] = Ka
[HA] [A− ]
solving for [A− ] and using Ca in place of [HA], we have [A− ] ≈ which is then differentiated:
Ca Ka [H+ ]
or
log [A− ] ≈ log Ca − pKa + pH
d(log [A− ]) =1 dpH
(80)
This slope together with point 1 define the line representing [A− ] in the left part of the diagram. 25
A A A A AA A A A A A A AAAAAAAAAAAAA A A A A A A A A A A AA AAAAAAAAAAAAA A A A A A A A A A A AA AAAAAAAAAAAAA A A A A A A A A A A A A A A A A AA AAAAAAAAAAAAA A A A A AA pH
pK = 4.74
0
2
4
6
8
10
Ð log concentration
[H+]
[OH
2
[HAc]
12
1
2
[AcÐ]
4
6
3
8
Figure 9: Log-C vs pH diagram for a 10−3 M acetic acid solution.
26
0
pK1 = 2.2
pK2 = 7.2
[H2PO4Ð]
Ð1
pK3 = 12.3
[HPO42Ð]
5 [H3PO4]
Ð2 [H+] Ð3
[OHÐ]
3 2
log concentration
Ð4
4
[PO43Ð]
1
Ð5 [HPO42Ð]
Ð6
[H2PO4Ð]
Ð7 Ð8 Ð9 1
2
3
4
5
6
7
8
9
10
11
12
13
pH Figure 10: Log-C diagram for the phosphoric acid system • In alkaline solutions where pH ≫ pKa , [HA] ≈
[A− ][H+ ] , Ka
which gives a slope of −1:
log [HA] = log Ca − pH + Ka d[HA] = −1 dpH
(81)
The proton condition for a solution consisting mostly of the base form is [HA] + [H+ ] = [OH− ]
or
[HA] ≈ [OH− ]
(82)
which defines point 3 in Fig. 9. Logarithmic concentration diagrams afford a quick means of estimating the equilibrium composition of acid-base systems without resorting to computation. For this purpose, we add the lines corresponding to [H+ ] and [OH− ]. The slopes of these lines will be ±1, and the lines for [HA] and [A− ] will be parallel to them.
5.1
Polyprotic acids
Whereas pH calculations for solutions of polyprotic acids become quite complex, the log-C plots for such systems simply contain a few more lines but are no more difficult to construct that those for monoprotic
27
acids. Fig. ?? shows a plot for the triprotic acid H3 PO4 . There are three pKa ’s, each corresponding to a crossing point of the lines depicting the concentrations of a pair of conjugate species. One new feature is that at each pKa , the slope the line representing any species that is one pKa removed from that particular equilibrium changes from ±1 to ±2. This means that the species in question rapidly becomes insignificant as the pH continues to change in one direction. If Ca is not extremely small, one can obtain reasonably good estimates of pH of solutions of any single ampholyte by considering only the appropriate section of the diagram.
6
Acid- and base neutralizing capacity
As a measure of the average proton free energy per proton, the pH expresses only the intensity aspect of acidity; as such, pH is not conserved when the temperature, density, or ionic strength of a solution is changed, or when the concentration is altered. The corresponding capacity factor would be conserved under the above changes, and represents the number of equivalents per litre of strong acid or base required to bring the system to some arbitrary proton level– usually to the pH corresponding to a given equivalence point. One such capacity factor is [SID], also known as [ANC], acid-neutralizing capacity, or alkalinity. Conceptually, [ANC] represents the difference in concentrations of species containing protons in excess of the reference level, and the concentrations of species possessing empty proton levels. For a solution of pure HA in water, the HA itself and H2 O define the proton reference level; species such as H2 A+ and H3 O+ represent proton-excess levels, and A− and OH− are proton-deficient levels: [ANC] ≡ [SID] = [A− ] + [OH− ] − [H+ ] = Ca α1 + [OH− ] − [H+ ]
(83)
[ANC] expresses the net deficiency of protons with respect to the reference level, i.e., the number of equivalents per litre of protons that must be added to fill all the empty levels up to HA. The concept of alkalinity becomes most useful in more complicated systems (such as carbonate) and in solutions containing more than one acid-base system. Another view of [ANC] is that it is the integration of the buffer intensity over a given pH range: [AN C] =
Z
fn
βd(pH)
(84)
fm
Although [ANC] can assume negative values, it is customary to use another quantity, [BNC] in this region. Base-neutralizing capacity is also known as the acidity. [BNC] measures the quantity of protons that must be removed (by reaction with strong base) in order to empty all proton levels down to and including HA, thus restoring the system to A− and H3 O+ . [BNC] = [HA] + [H+ ] − [OH− ] = [A− ]α0 + [H+ ] − [OH− ] Problem Example 6 Find the [ANC] of a solution of 1. 0.01 M HCl: 2. .01 MNaOH:
[A− ]α1 + [OH− ] − [H+ ] = (.01)(1) − .01 = 0.0 M (.01)(0) + .01 − 0 = .01 M
3. .01 M acetic acid at pH = pKa = 4.7;
(.01)(.5) − 2 × 10−5 ≈ .005 eq/L
28
(85)
Problem Example 7 Find the [ANC] and [BNC] of a solution of acetic acid (pKa = 4.7, Ka = 1.8 × 10−5 , that has been adjusted to a pH of 6.0 by addition of NaOH. α0 =
[H+ ] 1 10−6 = = .053 + = (18 + 1) × 10−6 19 Ka + [H ] α1 = 1 − .053 = .947
[ANC] = (.01)(.947) − 10−6 = .00957 eq/l [BNC] ≈ (.01)(.053) = .00053 eq/l
29
[From J. Zobrist and W. Stumm, Forschung und Technik, Neue ZŸrcher Zeitung, June 1979.]
AAAAAAAAAAAA AAAAAAAAAAAA AAAAAA AAAAAA AAAAA HCl
H2SO4
HNO3
Acids (from pollution and volcanic emissions)
+
MgCO3
NH3
CaCO3
NaCl + KCl
Bases (introduced into the atmosphere)
+ Neutral aerosols
CaSO4
SiO2 + Aluminosilicates
Rain
20 mmol of charge
AAAAAAAAAAAAA AAAAAAAAAAAAA AAAAAAAAAAAAA AAAAAAAAAAAAA ClÑ
NO3
Ñ
H+ (strong acids)
Na+, K+
anions
SO42Ñ
Ca2+
cations
NH4+
Mg2+
Figure 11: Origin of acid rain
7
Acid rain
As will be explained in the next section on the carbonate system, all rain is “acidic” in the sense that exposure of water to atmospheric carbon dioxide results in the formation of carbonic acid H2 CO3 which will eventually reduce the pH to 5.7. The term acid rain is therefore taken to mean rain whose pH is controlled by substances other than CO2 and which can lower the pH into the range of 3-4. The major culprits are sulfuric, nitric, and hydrochloric acids. Most of the H2 SO4 comes from the photooxidation of SO2 released from the burning of fossil fuels and from industrial operations such as smelting. As shown in Fig. ??, the atmosphere receives both acidic and basic substances from natural sources (volcanic emissions, salt spray, windblown dust and microbial metabolism) as well as from pollution. These react in a kind of gigantic acid-base titration to give a solution in which hydrogen ions must predominate in order to maintain charge balance.
November 6, 1994
c °1993 by Stephen K. Lower; all rights reserved.
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Contents 1 Proton donor-acceptor equilibria 1.1 Acid-base strengths . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1.2 1.3 2 pH 2.1 2.2 2.3 2.4 2.5 2.6
The ion product of water . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . the pH scale . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . and the proton free energy Proton sources and sinks . . . Leveling effect . . . . . . . . . Dissociation of weak acids . . Titration . . . . . . . . . . .
1 1 4 5
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5 5 7 7 7
Strong bases . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . Proton free energy and pH . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . .
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3 Quantitative treatment of acid-base equilibria 3.1 Strong acids and bases . . . . . . . . . . . . . . . . . 3.2 The strong ion difference . . . . . . . . . . . . . . . . 3.3 Weak monoprotic acids . . . . . . . . . . . . . . . . 3.4 Pure acid in water . . . . . . . . . . . . . . . . . . . 3.5 Calculations on mixtures of acids . . . . . . . . . . . 3.6 Mixture of an acid and its conjugate base . . . . . . 3.7 General case of a weak acid/base system, using [SID] 3.8 Example calculations involving conjugate species . . 3.9 Diprotic acids . . . . . . . . . . . . . . . . . . . . . .
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bases . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . .
20 20 22 22
5 Logarithmic concentration diagrams 5.1 Polyprotic acids . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . .
25 27
6 Acid- and base neutralizing capacity
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7 Acid rain
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4 Mixtures of conjugate acids 4.1 Buffer solutions . . . . . . 4.2 Titrations . . . . . . . . . 4.3 Ionization fractions . . . .
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List of Figures 1 2
Dependence of [H+ ] and pH of pure water on temperature. . . . . . . . . . . . . . . . . . Free energy diagram for acids and bases in aqueous solution. . . . . . . . . . . . . . . . .
4 6
3
Buffering action as a function of buffer concentration . . . . . . . . . . . . . . . . . . . . .
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Buffer intensity and titration curve for a diprotic acid . Buffering in strong- and weak-acid solutions . . . . . . . Titration curves of acids and bases of various strengths . Titration curve for a polyprotic acid, H3 PO4 . . . . . . Equilibrium fraction diagram for a monoprotic acid. . . Log-C vs pH diagram for a 10−3 M acetic acid solution. Log-C diagram for a diprotic acid . . . . . . . . . . . . . Log-C diagram for the phosphoric acid system . . . . . Origin of acid rain . . . . . . . . . . . . . . . . . . . . .
21 23 23 24 24 26 27 28 30
7 8 9 10 11 12
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